Solve Poisson equation on arbitrary 2D domain using the finite element method.
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Updated
Apr 15, 2015 - Python
Solve Poisson equation on arbitrary 2D domain using the finite element method.
Solve an obstacle problem (i.e, a partial differential equation with constraints)
Example solvers for the heat equation
Finite difference solver for the 'Variance Gamma' partial-integro differential equation (PIDE)
Solves simple diffusion equation in 1D
Selected homework assignments for a methods of applied math class
Code and Selected problems - Numerical Solutions of Wave Equations
Selected Solutions - Perturbation Theory and Methods
Mesh techniques for an ellipse for purpose of CFD.
Solver for the committor equation using the finite element method. Uses FEniCS and a potential of mean force obtained by colvars.
A program designed to solve partial differential equations using neural networks, that uses Theano for symbolic computation.
A Python-Based Elliptic Solver in Axisymmetry
Direct and Inverse Solver for Kinetic Capillary Electrophoresis (KCE)
Solution to Burger's Equation (inviscid), written in C, using Adams-Bashforth Methods. These methods include the one, two, and three step algorithms.
Wave equation solution for a drum membrane and guitar string using de finite difference method for solving partial differential equations.
Simulations for a minimal model of the dynamics of wave propagation of the action potentials in human ventricular tissue. In 2016.
Projects for "Computational Physics" (FYS4150) at the University of Oslo
PDE-based vector-valued image regularization routine.
This project is a part of my thesis focusing on researching and applying the general-purpose graphics processing unit (GPGPU) in high performance computing. In this project, I applied GPU Computing and the parallel programming model CUDA to solve the diffusion equation.
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